find the first order of partial derivatives
() Z=Tant (x+y)
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1
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The procedure is the same as the one that we used above. Begin by setting y=arctan(x) so that tan(y)=x. Differentiating both sides of this equation and applying the chain rule, one can solve for dy/dx in terms of y. One wants to compute dy/dx in terms of x.
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y = arcsin(x) -1 x 1.
d dx sin(y) = d dx x
cos(y) dy dx = 1
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Answer:
dy dc =1 .....it's answer hope it help you
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